1
Snout allometry in seahorses: insights on optimisation of pivot feeding performance 1
during ontogeny 2
3
Gert Roos1, Sam Van Wassenbergh1, Anthony Herrel1,2, Dominique Adriaens3 and Peter 4
Aerts1,4 5
6 1 Department of Biology 7 Universiteit Antwerpen 8 Universiteitsplein 1 9 B-2610 Antwerpen 10 Belgium 11 12 2 Département d’Ecologie et de Gestion de la Biodiversité 13 Muséum National d’Histoire Naturelle 14 57 rue Cuvier, Case postale 55 15 75231, Paris Cedex 5 16 France 17 18 3 Evolutionary Morphology of Vertebrates 19 Ghent University 20 K.L. Ledeganckstraat 35 21 B-9000 Gent 22 Belgium 23 24 4 Department of Movement and Sports Sciences 25 Ghent University 26 Watersportlaan 2 27 B-9000 Gent 28 Belgium 29 30
Running head: Optimising pivot feeding during ontogeny 31
32
Keywords: Syngnathidae, pivot feeding, ontogeny, scaling 33
34
Correspondence to: 35
Gert Roos 36
Univ. Antwerpen, Dept. Biologie Fax: 32-3820.22.71 37
Laboratory for Functional Morphology Phone: 32-3820.22.60 38
Universiteitsplein 1 E-mail: [email protected] 39
B-2610 Antwerpen 40
Belgium 41
2
Summary 1
As juvenile life-history stages are subjected to strong selection, these stages often show levels 2
of performance approaching those of adults, or show a disproportionally rapid increase of 3
performance with age. Although testing performance capacity in aquatic suction feeders is 4
often problematic, in pivot feeders like seahorses models have been proposed to estimate 5
whether snout length is optimal to minimise the time needed to reach the prey. Here, we 6
investigate whether the same model can also explain the snout lengths measured in an 7
ontogenetic series of seahorses, explore how pivot feeding kinematics change during 8
ontogeny, and test whether juveniles show disproportionate levels of performance. Our 9
analysis shows that the dimensions of the snout change during ontogeny from short and broad 10
to long and narrow. Model calculations show that the snout lengths of newborn and juvenile 11
seahorses are nearly optimal for minimizing prey reach time. However, in juveniles the centre 12
of head rotation in the earth-bound frame of reference is located near the posterior end of the 13
head, while in adults it has shifted forward and is located approximately above the eye. 14
Modelling shows that this forward shift in the centre of rotation has the advantage of 15
decreasing the moment of inertia and the torque required to rotate the head, but has the 16
disadvantage of slightly increasing the time needed to reach the prey. Thus, juvenile seahorses 17
appear to possess snout lengths close to optimal suggesting that they reach levels of 18
performance close to adult levels which illustrates the pervasive nature of selection on 19
performance in juveniles. 20
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3
Introduction 1
2
As juvenile life-history stages are subjected to strong selection (Carrier, 1996; Herrel and 3
Gibb, 2006), these stages often show levels of performance approaching those of adults, or 4
show a disproportionally rapid increase of performance with age (Carrier, 1995; Herrel and 5
O’Reilly, 2006; Moon and Tullis, 2006). Although this paradigm has received considerable 6
empirical support for terrestrial organisms (see review in Herrel and Gibb, 2006) it is 7
currently unclear whether this also holds in aquatic environments for traits other than escape 8
performance (Gibb et al., 2006). However, testing performance capacity in aquatic suction 9
feeders is often problematic (Holzman et al., 2008). Yet, in pivot feeders like seahorses 10
models have been proposed to estimate performance defined as the ability to minimise the 11
time needed to reach the prey (de Lussanet and Muller, 2007). Indeed, a critical aspect of 12
aquatic suction feeding is to bring the mouth close enough to the prey, such that the prey can 13
effectively be drawn into the mouth by the suction flow generated (Holzman et al., 2007; 14
Wainwright and Day, 2007, Holzman et al., 2008). Consequently, this model could be used to 15
test whether one aspect of suction feeding is optimised in juvenile life-history stages in pivot-16
feeding fishes. 17
Pivot feeders, like syngnathids (Muller, 1987; Bergert and Wainwright, 1997; Colson 18
et al., 1998, de Lussanet and Muller, 2007; Van Wassenbergh et al., 2008; Roos et al., 2009a), 19
flatfish (Muller and Osse, 1984; Gibb, 1997) and presumably viperfish (Tchernavin, 1953; 20
Muller 1987) do not rotate the neurocranium to increase the mouth opening (as in typical 21
suction feeders), but rotate their head to decrease the mouth-prey distance. When head 22
rotation reaches its maximum (and the mouth opening is directed towards the prey), the 23
buccal cavity starts to expand and draws the prey into the mouth (Roos et al., 2009b). During 24
pivot feeding only the head of the fish is accelerated towards the prey, while the body remains 25
approximately stationary (Van Wassenbergh et al., 2008). This is probably energetically more 26
advantageous than swimming towards the prey. Moreover, studies of syngnathid pivot 27
feeding reported relatively large lift angles of the head during feeding, for example 30° in 28
Syngnathus acus (de Lussanet and Muller, 2007), 25° in Syngnathus leptorhynchus (Van 29
Wassenbergh et al., 2008) and 25° in Hippocampus reidi (Roos et al., 2009a). Especially in 30
fish with elongated heads, such lift angles allow the mouth to overcome greater distances than 31
could be possible by jaw protrusion alone. 32
Among syngnathid pivot feeders, a large interspecific variation in snout dimensions 33
exists between adults. Snouts vary from extremely elongated and narrow as observed in for 34
4
example the weedy seadragon Phyllopteryx taeniolatus (Forsgren and Lowe, 2006; Kendrick 1
and Hyndes, 2005), to very stout and broad found in for example the pygmy seahorse 2
Hippocampus denise (Lourie and Randall, 2003). Given this variation in head and snout 3
dimensions the question arises how this affects pivot feeding. A recent theoretical model by 4
de Lussanet and Muller (2007) predicted the optimal snout length in syngnathids for reaching 5
the prey as quickly as possible by rotation of head and snout. This study showed that species 6
with longer snouts generally have a smaller cross-sectional diameter of the snout, which (at 7
least partly) compensates for the increased moment of inertia due to their relatively high snout 8
length. Because of a similar moment of inertia and narrower snouts, the species with 9
relatively long snouts will reach their prey faster than species with relatively short snouts. 10
This theoretical model was confirmed by anatomical measurements in a wide range of 11
syngnathid species (de Lussanet and Muller, 2007). 12
However, not only in an evolutionary, interspecific context, but also during ontogeny, 13
the snout of syngnathids undergoes significant morphological changes (Choo and Liew, 2006; 14
Leysen et al., in press). Choo and Liew (2006) showed that the shape of the snout changes 15
significantly throughout ontogeny in Hippocampus kuda. After the juveniles are expelled 16
from the male’s brood pouch, for instance, the head length is 25-33% of the standard length 17
(the summation of head, trunk and tail length), but this proportion decreases sharply to 17% 18
for three week old juveniles. The study of Choo and Liew (2006) only addressed scaling of 19
morphological traits such as head, trunk and tail length (Lourie et al., 1999) relative to 20
standard length. Yet, their illustrations of different ontogenetic stages of seahorses suggest 21
that the shape and size of different head parts also change. This could affect the kinematics of 22
pivot feeding during the first few weeks after the juveniles are expelled from the brood pouch. 23
Given this apparent cranial allometry in seahorses (Choo and Liew, 2006; Leysen et 24
al., in press), it can be questioned whether the previously documented snout-length 25
optimization principles (de Lussanet and Muller, 2007) also apply to growing seahorses. At 26
first glance, important kinematic differences seem to exist between adults and newborns. Van 27
Wassenbergh et al. (2009) showed that newly born seahorses of the species Hippocampus 28
reidi only need 2.5 ms to rotate their head over 40°. Adults on the other hand, need twice the 29
time to rotate their head over merely 25° (Roos et al., 2009a). However, the form-function 30
relationships of the pivot feeding system in this ontogenetic series of seahorse remain unclear. 31
In this paper, we test whether snout length is indeed optimised for pivot feeding in 32
juvenile compared to adult life history stages in the seahorse H. reidi. The ontogenetic series 33
consists of four juvenile age classes during which important morphological changes occur 34
5
(less than one week, one week, two weeks and three weeks) (Choo and Liew, 2006), and 1
adults. To test this hypothesis and to quantify an important aspect of suction feeding 2
performance the model of de Lussanet & Muller (2007) is used. To generate the required 3
input data for the model a kinematical analysis (high-speed video analysis) is used allowing 4
us to determine the position of the centre of rotation in the earth-bound frame of reference. 5
Morphometric data, in turn, allow us to estimate the moment of inertia of the head and snout 6
in each age class. Finally, scaling analyses are used to evaluate whether the measured 7
dimensions of head and snout relevant for pivot feeding change during ontogeny. 8
9
Materials and methods 10
11
Husbandry 12
13
A total of 15 adult individuals of the seahorse species Hippocampus reidi were obtained 14
through the commercial aquarium trade. These seahorses were kept together in a large tank 15
(600 l) with a constant temperature of 24 °C and constant salinity of 35 ppt. Animals were fed 16
defrosted mysids daily. When a male seahorse expressed signs of pregnancy, it was placed 17
inside a large net in the same tank in which the male was left undisturbed. As the juveniles 18
left the male’s pouch, they were captured in the net and were transferred to a smaller tank (30 19
l). These juveniles were fed freshly hatched brine shrimps, three times a day. Several males 20
gave birth at different times and batches of different ages were kept in separate tanks. In total, 21
five different age classes were used in this study: less than one week, one, two, three weeks 22
and adults. 23
24
Scaling of head and snout dimensions 25
26
A total of 76 specimens (20, 20, 11, 15 and 10 individuals for respectively the age classes less 27
than one week, one week, two weeks, three weeks and adult with standard lengths ± S.D. of 28
5.83 ± 0.43, 7.11 ± 0.77, 10.12 ± 1.50, 12.57 ± 1.52 and 106.66 ± 6.94 mm, respectively) 29
were photographed (ALTRA 20 with resolution 1596 x 1196 pixels, Soft Imaging System 30
GmbH, Münster, Germany) in lateral and in dorsal view. Specimens were preserved in 31
neutralised and buffered formalin solution for a duration of five months. The head and snout 32
dimensions in each digital photo were measured using ImageJ software (1.41m, W. Rasband, 33
National Institute of Mental Health, Bethesda, MA, USA). In analogy to de Lussanet & 34
6
Muller (2007), snout shape was approximated by an elliptical cylinder and the head without 1
the snout was modelled as a half-ellipsoid (Fig. 1). The snout length l was measured as the 2
distance between the point at the level of the neck joint (the intercept of the line starting from 3
the middle of the coronet to the dorsal ridge of the operculum) to the tip of the snout. The 4
snout width w was defined at the level of the articulation of the lower jaw with the quadrate 5
and the snout height h was represented from the articulation of the lower jaw with the 6
quadrate to the frontal tip of the vomer. The head length L was measured as the distance 7
between the point at the level of the neck joint to the anterior part of the frontal bone. The 8
head height H was defined perpendicularly with L at the level of the approximate neck joint 9
and head width W was represented as the distance between the opercula (Fig. 1). 10
Morphometric data were log-transformed and regressed on snout length l. The slopes 11
of the regression lines were determined for each plot. To test whether each slope was 12
significantly different from the predicted slope (isometry, slope = 1), the latter was subtracted 13
from the measured slope and divided by the standard error of the measured slope (S.E.M.) to 14
obtain a t-value (Sokal and Rohlf, 1995). Slopes significantly smaller than 1 indicate negative 15
allometry, while a slope greater than 1 indicates positive allometry. 16
17
High speed video recordings 18
19
During filming sessions, the juveniles were transferred to a very small glass tank (6 ml). 20
Several juveniles (2-3) were placed in this tank and multiple prey items were provided to 21
increase the chance of capturing a feeding event on video. The duration of a filming session 22
was 30 minutes after which the juveniles were replaced by 2-3 other juveniles. Adults were 23
transferred to a 30 l tank, with a narrow section. The adult seahorses were trained to feed in 24
this section to increase the chance of filming the animals with the midsagittal plane of their 25
heads at an angle perpendicular to the camera. 26
Videos were made with a digital high-speed video camera (Redlake Motionscope M3, 27
Redlake Inc., Tallahassee, FL, USA) with a 20 mm lens (Sigma EX, Sigma Benelux, 28
Nieuwegein, The Netherlands). Two arrays of eight ultra bright LEDs were used for 29
illumination. The videos of the juveniles and the adults were recorded at a speed of 8000 30
frames per second and a shutter time of 0.05 ms. Only videos with the lateral side of the head 31
oriented perpendicular to the camera lens were retained for further analysis. A total of 71 32
videos were analysed: 11, 16, 14, 18 and 12 for the age classes of, respectively, less than one, 33
one, two, three weeks and adult. Four recordings were analysed for each of the three adult 34
7
individuals. The juveniles, however, could not be distinguished from one another during 1
filming sessions. To avoid pseudoreplication, the juvenile data was averaged for individuals 2
filmed in the same tank during a filming session (Hernandez, 2000). 3
4
Centre of head rotation 5
6
The position of the centre of rotation (CR) was calculated based on the high-speed video 7
recordings for each age class (Van Wassenbergh et al., 2008). To simplify the estimation of 8
the position of CR, the head and body were treated as two rigid elements and the average 9
position of CR was calculated for a pre-defined time interval. A fixed time interval was 10
selected for each of the 71 video recordings from the beginning of the feeding strike (i.e. prior 11
to the start of hyoid rotation and thus prior to head rotation, time = 0 ms) until the frame at 12
which the head rotation was near its maximum (time = 2 ms and 3 ms for juveniles and adults, 13
respectively). Two landmarks were traced in each of these frames: the tip of the snout and the 14
tip of the nose spine just anterior to the eye. The common centre of the angular displacement 15
of these two landmarks (i.e. the CR) was determined as the intersection of the mid-normals of 16
the line segments interconnecting each landmark at the start and end of the time interval (Fig. 17
2). As the velocity of the seahorse due to swimming during this short time interval is 18
negligibly small (only 0.02 m s-1), this common centre corresponds to CR in the earth-bound 19
frame of reference (de Lussanet and Muller, 2007; Van Wassenbergh et al., 2008). 20
Next, the distance R between CR and the centre of volume of the head (approximated 21
by a half-ellipsoid) and the distance r between CR and the volume middle of the snout 22
(approximated by an elliptical cylinder) were calculated for each age class (Fig. 1). R and r 23
were log-transformed and regressed to log snout length l. Like the analysis of the 24
morphometric data, the slopes of the regression lines were calculated and tested for isometry 25
as described above. 26
27
Moment of inertia 28
29
First, the model of de Lussanet and Muller (2007) requires the moment of inertia of head and 30
snout as input. Since the dimensions of head and snout and the position of CR are determined, 31
the moment of inertia of head and snout relative to this defined CR can be calculated as 32
follows (de Lussanet and Muller, 2007): 33
8
⎟⎠
⎞⎜⎝
⎛++⎟
⎠⎞
⎜⎝⎛ −= ²
20²²
649
51
6RHLWHLI headhead
ρπα (1) 1
⎟⎠⎞
⎜⎝⎛ ++= ²
16²
12²
4rhlwhlI snoutsnout
ρπα (2) 2
,where W, H, L are the width, height and length, respectively, of the half-ellipsoid (the head) 3
and w, h, l are the width height and length, respectively, of the elliptical cylinder (the snout). 4
The density ρ equals the density of the surrounding seawater, which is 1023 kg m-3. When the 5
head rotates in the water column, unavoidably an amount of water around the head and snout 6
will be accelerated as well. To account for this added mass of water, we calculated a 7
correction factor for head (αhead) and snout (αsnout) via the added mass coefficients of flow 8
over elliptical cylinders with different aspect ratios with the formula given in Van 9
Wassenbergh et al. (2008) which is derived from Daniel (1984): 10
11438.2 /784.0 += − WHheadα (3) 11
11438.2 /784.0 += − whsnoutα (4) 12
The moment of inertia of head and snout with respect to CR was calculated for each 13
individual of each age class. The total moment of inertia Itotal relative to CR was the sum of 14
Ihead and Isnout (de Lussanet and Muller, 2007). Note that de Lussanet and Muller (2007) did 15
not include the terms r and R in their presented formula’s notwithstanding that the terms were 16
included in their actual simulations. Here, we worked out the same formula’s but with 17
inclusion of the R and r terms. 18
snoutheadtotal III += 19
⎟⎟⎠
⎞⎜⎜⎝
⎛+++=
46448
222 rhlwhlII snoutheadtotal ρπα 20
⎟⎟⎠
⎞⎜⎜⎝
⎛+++=
46448
233 whlrlwhwhlII snoutheadtotal ρπα (5) 21
To estimate the accuracy of Itotal obtained from the two simple geometric figures, we also 22
calculated Itotal using the method described in Drost and van den Boogaart (1986). In this 23
method the head was represented as a series of elliptical cylinders and Itotal was the sum of the 24
moment of inertia of each cylinder relative to CR (see also Van Wassenbergh et al., 2008). In 25
this way, Itotal could be calculated more precisely, accounting for contour lines of the head and 26
snout. The difference between Itotal obtained from the two geometric figures and Itotal obtained 27
from 20 elliptical cylinders was less than 10%. Therefore, to keep the model as simple as 28
9
possible, we choose for the method in which the head and snout are represented by a half-1
ellipsoid and an elliptical cylinder, respectively. 2
For the scaling analysis, this data was log-transformed and regressed to log snout 3
length l. The slope of the regression line was determined, and a t-test as described above 4
tested for isometry (slope = 5). 5
6
Work input 7
8
A second model input required is a realistic amount of work done by the head elevator 9
muscles for generating head rotation (de Lussanet and Muller, 2007). The angular velocity, 10
needed to calculate the rotational kinetic energy was obtained from the high-speed video 11
recordings. 12
In the 71 selected videos, the same two landmarks, used to determine the centre of 13
head rotation, were digitised frame by frame using Didge (version 2.2.0, A. Cullum, 14
Creighton, Omaha, NE, USA) (Fig. 2). With these two landmarks, head rotation was 15
calculated. The profiles were filtered with a fourth-order, zero phase-shift Butterworth filter 16
with a low-pass cut-off frequency of 2000 Hz to reduce digitisation noise. Angular velocity of 17
head rotation was obtained through numerical differentiation. The maximum head rotation, 18
the angular velocity of head rotation, the time to peak head rotation, and angular velocity were 19
log-transformed and regressed to log snout length l. Finally, to study kinematic scaling 20
relationships, the slopes of the regression lines were calculated. These analyses were 21
performed for the adult and juvenile data combined and for the juvenile data with exclusion of 22
the adult data. In this way we can investigate whether the kinematic scaling relationship is a 23
result of changes in morphological structures or because of the large size difference between 24
adults and juveniles. 25
Now the rotational kinetic energy E, needed to rotate the head can be calculated with 26
the formula: 27
2
2TtotalIE θ&
= (6) 28
, where Itotal is the total moment of inertia of head and snout relative to CR (equation 5) and 29
Tθ& is the average maximal angular velocity of head rotation obtained from the high-speed 30
videos. 31
32
10
Minimal reach time and optimal snout length 1
2
The angle θT over which the head needs to rotate for the mouth to travel distance d to reach 3
the prey is 4
⎟⎟⎠
⎞⎜⎜⎝
⎛=
fd
T arcsinθ (7) 5
, which was approximated by 6
⎟⎟⎠
⎞⎜⎜⎝
⎛≈
fd
Tθ (8) 7
, in which f is the distance between CR and the tip of the snout. The variables d and f were 8
measured and adjusted for each age class to account for a possible change of prey position 9
relative to the snout tip during ontogeny. For the largest head rotation observed in our data 10
(44°), we numerically validated that the simplifying approximation of equation 7 did not 11
significantly affect the outcome of the model (i.e. optimum snout length). Combination of 12
equation 6, 7 and 9 gives (de Lussanet and Muller, 2007): 13
EI
fdT total
T
T
2≈=
θθ& (9) 14
When we substitute equation 5 into equation 9, we can calculate the reach time for a given 15
snout length: 16
⎟⎟⎠
⎞⎜⎜⎝
⎛+++≈
4432
233
2
2 whlrlwhwhlIEf
dTsnout
headsnout
ρπαρπα (10) 17
The minimal reach time can be found by solving equation 10 for a continuous range of snout 18
lengths l. In this way the optimal snout length lopt, which corresponds with the minimal reach 19
time Tmin, can be determined. 20
Paired t-tests were used to statistically compare the measured snout lengths with the 21
calculated optimal snout lengths, predicted by the model, for different individuals of each age 22
class. 23
24
Effect on the position of the centre of rotation on the optimal snout length 25
26
De Lussanet and Muller (2007) calculated the optimal snout length for several syngnathid 27
representatives assuming the position of the centre of rotation (CR) in each species is equal to 28
the position of CR in Syngnathus acus. Given that the juveniles of Hippocampus kuda 29
11
undergo morphological changes during growth (Choo and Liew, 2006), it can be expected 1
that the position of CR will change in the different age classes of Hippocampus reidi used in 2
this study. We used the model of de Lussanet and Muller (2007) to investigate how the 3
change in position of CR affects the optimal snout length. 4
We assumed that the position of CR could change relative to its in vivo CR by 5
translating parallel to the snout length axis. We defined b as the distance between CR and the 6
midpoint of the snout alongside the snout length axis divided by the distance between the 7
most posterior point on the head and CR alongside the same axis (Fig. 3). For practical 8
reasons, we used four discrete values of b in each age class: b = 1, b = 0.75, b = 0.5 and b = 9
0.25 (Fig. 3). The calculation of lopt was repeated for these four different positions of CR, 10
assuming no change in all other model input parameters within each age class. 11
In theory, a CR positioned near the centre of volume of the snout implies that the snout 12
must rotate over a larger angle θT (when snout-prey distance d remains constant) compared to 13
a snout in which the CR is located near its posterior end. However, rotating over a larger 14
angle with a similar amount of work inherently implies a decrease of the realised torque. This 15
means that a CR near the eye will require a lower torque than a CR located near the posterior 16
end of the head for the mouth to travel a certain distance. To investigate the relationship 17
between torque, snout length and CR position we calculate the torque Q with the formula: 18
T
EQθ
= (11). 19
20
Results 21
22
Scaling of head and snout dimensions 23
24
The increase in head length is negatively allometric with respect to snout length (table 1), 25
indicating faster growth of the snout relative to the head. Snout width and snout height both 26
scale negatively allometrically relative to snout length (table 1). Head width and head height 27
scale negatively allometrically with snout length (table 1). 28
29
Centre of head rotation 30
31
The distance R between the centre of head rotation (CR) and the volume middle of the head 32
scales negatively allometrically relative to head length (table 1). The distance r between CR 33
12
and the volume middle of the snout also shows a negatively allometric relation with snout 1
length (table 1). These results indicate that as the snout and the head length increase, the 2
relative position of CR changes as well. The length of R and r relative to snout length changes 3
from 0.60 and 0.61, respectively, for juveniles aged less than a week to 0.48 and 0.28, 4
respectively, for adults. During growth the position of CR changes in the anterior direction 5
relative to the snout and head (Fig. 4). Furthermore, the slope of the log-log regression of total 6
moment of inertia on snout length is 4.53 ± 0.02 (table 1), which is significantly lower than 7
that predicted by isometry (slope = 5). 8
9
Kinematics of head rotation 10
11
The magnitude of head rotation decreases during ontogeny. More specifically, the 12
maximum head rotation in the earth-bound frame in the age classes less than one week, one 13
week, two weeks, three weeks and adult is 44 ± 2, 43 ± 3, 37.7 ± 1.7, 33.3 ± 1.3 and 25 ± 3 14
deg, respectively (mean ± S.E.M.) (Fig. 5A and table 2). This decrease in head rotation is 15
significant for the data of juveniles and adult combined, as well as within the juvenile data 16
(table 3). Additionally, smaller seahorses reach maximal head rotation earlier. The time to 17
peak head rotation increases from 3.3 ± 0.3, 3.11 ± 0.17, 3.36 ± 0.18 and 3.78 ± 0.18 ms in 18
the juveniles less than one week, one week, two weeks and three weeks to 6.4 ± 0.9 ms in 19
adults (Fig. 5A and table 2). The increase in time to peak head rotation is also significant for 20
the data of juveniles and adult combined as well as within the juvenile data (table 3). 21
The larger head rotation combined with the shorter reach time results in higher angular 22
velocities in smaller seahorses. More specifically, the maximal angular velocity of head 23
rotation is 32.5 ± 1.5, 33 ± 4, 26.5 ± 1.2, 21.9 ± 1.4 and 15.3 ± 1.2 10³ deg s-1 for the age 24
classes less than one week, one week, two weeks, three weeks and adult, respectively (Fig. 5B 25
and table 2). This decrease of angular velocity is again significant in the data of juveniles and 26
adults combined and within the juveniles (table 3). The time to peak angular velocity of head 27
rotation ranges from 1.35 ± 0.06, 1.32 ± 0.08, 1.30 ± 0.07, 1.40 ± 0.05 ms in juveniles to 2.57 28
± 0.12 ms in adults (Fig. 5B and table 2). In the data of juveniles and adults combined, the 29
slope of the regression line shows a significant increase of angular velocity (table 3). 30
However, no clear relation was found for the time to maximum angular velocity in the 31
juvenile data (table 3). 32
33
Optimal snout length 34
13
1
The results of the paired t-tests show that the optimal snout length is significantly longer than 2
the measured snout length in each juvenile age class (table 4). In the adults, on the other hand, 3
there is no significant difference between the optimal snout length and the measured snout 4
length (table 4). 5
We also determined the range of snout lengths for which the model predicts a less than 6
5% increase time to reach the prey compared to the optimum reach time. All measured snout 7
lengths of the juveniles are situated between the lower and upper limit of snout lengths set by 8
this 5% increase of the minimal reach time (table 5). 9
10
Effect of the centre of rotation position on optimal snout length 11
12
Moment of inertia 13
The total moment of inertia increases with increasing snout length. For example, in a juvenile 14
less than one week old the total moment of inertia with respect to the centre of head rotation, 15
obtained through the video recordings, is 0.94 10-12 kg m² for a snout length of 100% (i.e. the 16
measured snout length). Doubling the snout length increases the moment of inertia relative to 17
the same CR by 3.54 times. With a CR located at the posterior end of the snout, the total 18
moment of inertia increases more rapidly with increasing snout length compared to a CR 19
located more anteriorly and therefore closer to the centre of mass (Fig. 6). 20
21
Reach time 22
There is a clear difference between the juveniles and the adults in the effect of CR position on 23
the time for the mouth to reach the prey. In the juveniles the combination of the real b, which 24
is located near the posterior end of the snout, with the measured snout length is nearly optimal 25
to minimize the reach time (Tmin = 2.75 ms for b = 1 and a snout length of 100%). In adults, 26
on the other hand, the model predicts that the prey is reached faster with the combination of a 27
CR located at the posterior end of the snout and a much shorter snout (Tmin = 2.91 ms for b = 1 28
and a snout length of 38%) (Fig. 6). 29
30
Required torque 31
According to the model, newborn seahorses show a CR for which a relatively high torque is 32
required (to convert an amount of elastic energy into head rotation). Unlike juveniles, the 33
adults display a CR for which relatively low torque is required (Fig. 6). 34
14
1
Discussion 2
3
The main hypothesis of this study tested whether the snout length in seahorses is optimized to 4
reach the prey as fast as possible for different ontogenetic stages. A recent mathematical 5
model (de Lussanet and Muller 2007) allowed us to calculate the theoretical optimal snout 6
lengths, which were then compared to the actually measured snout lengths. Our results 7
showed that the measured snout length in each juvenile age class (less than one week, 1, 2 and 8
3 weeks) was slightly shorter than the optimal snout length predicted by the model (table 4). 9
However, this small deviation from the predicted optimum snout length corresponded to a 10
difference of less than 1% from the shortest time to reach the prey that was predicted by the 11
model if the snout length was perfectly optimized for this function (table 5). Therefore, we 12
must conclude that, similarly to adults for which no statistical difference was found between 13
the predicted and measured snout length (table 4), the snout length in juveniles can also be 14
considered as optimized to reach the prey as fast as possible. 15
However, the snout length in H. reidi approximates the optimum, as calculated by the 16
model (de Lussanet and Muller, 2007), not only on an inter-specific level but also in an 17
ontogenetic context. In contrast to pivot-feeding fish, other suction feeders use neurocranium 18
rotation to increase the gape and expand the buccal cavity (Lauder, 1985; Van Wassenbergh 19
et al., 2004; Gibb and Ferry-Graham, 2005) and thus not to decrease the predator-prey 20
distance as in pivot feeders. Because general suction feeding fishes are not adapted for pivot 21
feeding, it would not be surprising to find a poor match between the observed morphology 22
and the predictions of the pivot-feeding model (de Lussanet and Muller, 2007). Indeed, when 23
applying this model to a dorso-ventral flattened catfish Clarias gariepinus and a lateral 24
flattened sunfish Lepomis gibbosus (assuming that the region anterior to the eye represents the 25
snout and the centre of rotation is identified as the joint between the supra-cleithrum and the 26
post temporal bones), the optimal snout length of the catfish and the sunfish for pivot feeding 27
would be, respectively, approximately three and two times shorter than the measured length. 28
This clearly shows that different optimization criteria apply to the head morphology of pivot 29
feeders versus non-pivot feeders. 30
According to Hernandez (2000) the water flow regime could greatly affect the scaling 31
of prey capture kinematics. However, the model we used to calculate optimal snout lengths 32
(de Lussanet and Muller, 2007) does not account for the effects of Reynolds number. Perhaps 33
the small deviation between measured and predicted snout length in the juveniles is a result of 34
15
the more viscous flow regime in which the juveniles live. To estimate the effect of the more 1
viscous environment on the calculations of the optimal snout length, we increased the added 2
mass around the rotating seahorse head as an approximating mimic of the increased volume of 3
the boundary layer around the moving head. These simulations showed no effect on the 4
model’s output, suggesting that the difference in flow regime is probably not an important 5
factor of influence on the optimal snout length in pivot feeders. 6
Another simplification in the model of de Lussanet and Muller (2007) is the 7
assumption that the position of the centre of rotation (CR) of the species studied is equal to 8
that of Syngnatus acus. This assumption should be used with caution as our analysis shows 9
that the position of CR changes during ontogeny (Fig. 4), thereby affecting the results of the 10
model (Fig. 6). For instance, in juveniles less than one week old the position of CR is located 11
at the posterior end of the head, near the articulation of the head with the vertebral column 12
(Fig. 4). When the snout of the juveniles grows longer, CR appears to shift in the direction of 13
the snout tip and in adults CR is located just above the eye (Fig. 4). Since the CR position 14
inevitably has important effects on the dynamics of head rotation, this needs further 15
consideration. 16
We explored the consequences of this change in position of CR by calculating the total 17
moment of inertia relative to four discrete positions of CR for different snout lengths in each 18
age class (Fig 6). Additionally we calculated the minimal reach time for each snout length at 19
the four different positions of CR (Fig 6). Our findings suggest that moving CR influences 20
two aspects of pivot feeding: (1) decreasing the distance between CR and the middle of the 21
snout decreases the total moment of inertia of the head and snout. This seems desirable, 22
especially for individuals that are relatively large. (2) However, decreasing the distance of CR 23
to the middle of the snout increases the minimal reach time needed to bridge a certain 24
distance, which likely decreases an individual’s chances of prey capture. Consequently, a 25
short snout with a large distance of CR to the middle of the snout seems the most preferable 26
situation: the total moment of inertia is nearly the same as for the same snout length with CR 27
near the eye, and the animal has the shortest minimal reach time (Fig. 6). However, for 28
rotations around a more posterior positioned CR, the animal must rotate its head over a 29
relatively small angle to cover a given prey distance compared to an animal with the same 30
snout length but with CR located near the eye. In the latter case higher velocities will be 31
reached, due to a lower torque (when energy input E is constant) (Fig. 6). These results 32
suggest that as the seahorse’s snout length increases, it is preferable to have a CR close to the 33
middle of the snout to reduce the moment of inertia and the torque required to rotate the head 34
16
which is confirmed by our data (Fig. 4). The downside of this phenomenon is that the 1
potential minimal reach time increases as the angle over which the head needs to be rotated 2
increases with constant prey-snout distance. 3
Although snout length appears to be optimized for head rotation during ontogeny, the 4
observed allometry of the head and snout during ontogeny may still have important effects on 5
head rotation kinematics. Indeed, as seahorses get larger, their snout grows relatively faster 6
than their head and also becomes relatively more slender, while head width and head height 7
decrease relative to head length. The consequences of this shape change during growth for 8
feeding performance may be significant as an increase in relative snout length will decrease 9
the angle over which the head is rotated during pivot feeding if prey position with respect to 10
the snout tip remains identical. Our kinematic data support this and show that the maximal 11
head rotation decreases from 44° in juveniles less than one week old to approximately 35° in 12
juveniles 3 weeks of age and finally to 25° for adult H. reidi (Fig. 5A). As the head rotation 13
angle decreases with increasing snout length, the time at which peak head rotation is achieved 14
increases as well (Fig. 5A). As a result, the angular velocity of head rotation decreases in 15
growing seahorses. The angular velocity of a juvenile of less than one week old is two times 16
higher than that in adults allowing them to reach the prey in times similar to or smaller than 17
those observed for adults (Fig. 5B). The decrease in velocity during growth might be 18
explained by our observation that the moment of inertia scales with L4.53. This means that the 19
rotational inertia most likely increases more rapidly than the available muscle moment in case 20
of isometric growth (M = r x F; r ~L, F~L², thus M ~L³). Remark that if the angular velocity is 21
to remain constant, the cross-sectional area of the muscles must scale with L3.53. 22
Consequently, snout allometry indeed seems to be reflected in head rotation kinematics. 23
Despite that both the juvenile and adult snout lengths are optimized to reach the prey 24
as fast as possible, we observed that the feeding success in juveniles is relatively low 25
compared to adults. The reason for this is currently unclear. Previous studies on pivot feeding 26
in adult syngnathids showed that the kinematics of pivot feeding are relatively stereotypical 27
(Muller, 1987; Bergert and Wainwright, 1997; Colson et al., 1998, de Lussanet and Muller, 28
2007; Van Wassenbergh et al., 2008; Roos et al., 2009a), but this is also the case for juveniles 29
(Van Wassenbergh et al., 2009). Moreover, all muscles, ligaments and tendons involved in 30
pivot feeding appear to be present in early juveniles (Van Wassenbergh et al., 2009; Leysen et 31
al., in press). Perhaps some unidentified developmental constraints exist which may explain 32
the low prey capture success in juveniles. 33
17
A possible developmental constraint on feeding success in juvenile seahorses may be 1
related to the position of the head’s centre of rotation (CR) and the potential effects of this on 2
visual performance during feeding. Seahorses are visual predators (James and Heck, 1994; 3
Curtis and Vincent, 2005, Mosk et al., 2007) feeding on small crustaceans (Kanou and 4
Kohno, 2001; Teixeira and Musick, 2001; Woods, 2002; Kitsos et al., 2008). It could be 5
important for the seahorse to maintain focus on the prey during head rotation to kinematically 6
fine-tune the final stages of suction feeding. A CR located near the eye seems advantages in 7
this respect since this causes only little movement of the eye which could result in sharp 8
vision even during the fast rotation of the head. We observed that the adult seahorses focus 9
their eyes in the direction of the prey at all time during the feeding strike (pers. obs.). In 10
juveniles, on the other hand, CR is located almost half a snout length from the eye. Therefore 11
the eye undergoes a large translation and rotation, which may result in blurred vision during 12
the feeding strike. Although this could explain the relatively low prey capture success 13
observed for juveniles, this idea will remain speculative as long the nature and importance of 14
visual feedback during pivot feeding is poorly known. 15
16
Conclusion 17
Our data show that the relatively broad snout in newborn juveniles is optimized in length to 18
reach the prey as fast as possible. Despite the fact that the measured snout length in juveniles 19
is slightly shorter than the predicted snout length, the time to reach the prey of the measured 20
snout lengths is only negligibly higher than the minimal reach time of the predicted snout 21
lengths. When the snout becomes relatively narrower during growth, snout lengthening can 22
also be explained as an optimization for pivot feeding. This snout lengthening probably 23
causes the observed decrease of the angle over which the head needs to be rotated during 24
ontogeny. Additionally, the centre of head rotation (CR) has shifted towards the eye region, 25
which decreases the moment of inertia and the torque required for rotating the head, and could 26
improve potential visual feedback control during prey capture. However, these advantages of 27
shifting CR forward trade off with a slight increase in the minimal prey reach time. Therefore, 28
the complex relationship between snout length, CR position, and optimal reach time can be 29
important determinants of feeding performance during ontogeny of syngnathid fish. The 30
observed optimal snout length from the moment when the juveniles are expelled from the 31
male’s brood pouch may implicate that the early stages of ontogeny are subjected to strong 32
selection (Carrier, 1996; Herrel and Gibb, 2006) and that the juveniles need similar feeding 33
performances (i.e. reaching the prey in minimal time) as that of adults to survive. 34
18
1
2
Acknowledgements 3
4
G.R. is funded by a Ph.D grant of the Institute for the Promotion of Innovation through 5
Science and Technology in Flanders (IWT-Vlaanderen). S.V.W. is postdoctoral fellow of the 6
Fund for Scientific Research, Flanders (FWO-Vl). Supported by FWO-Vl grant G 053907. 7
Further, the authors thank David Vuylsteke, Joachim Christiaens and Heleen Leysen for 8
taking care of the seahorse juveniles. 9
10
Appendix A: list of symbols 11
12
αhead Added mass coefficient of the head 13
αsnout Added mass coefficient of the snout 14
b The distance between CR and the midpoint of the snout alongside the snout 15
length axis divided by the distance between the most posterior point on the 16
head and CR alongside the same axis 17
CR Centre of head rotation in the earth-bound frame of reference 18
d Distance between the snout tip and the prey 19
E Rotational kinetic energy 20
f Distance between the snout tip and the centre of rotation 21
H Head height 22
h Snout height 23
Ihead Moment of inertia of the head relative to the centre of rotation 24
Isnout Moment of inertia of the snout relative to the centre of rotation 25
Itotal Total moment of inertia of head and snout relative to the centre of rotation 26
L Head length 27
l Snout length 28
lopt Optimal snout length predicted by the model 29
Q Torque 30
ρ Density of seawater 31
R Distance between the centre of rotation and the volume middle of the head 32
r Distance between the centre of rotation and the volume middle of the snout 33
19
Tθ& Average maximal angular velocity of head rotation 1
θT Head rotation 2
T Reach time 3
Tmin Minimal reach time predicted by the model 4
W Head width 5
w Snout width 6
7
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18
Tables 19
20
Table 1: Results of the linear regression analysis on the log-log transformed dimensions of 21
head and snout relative to snout length. The parameters R, r, I represents the distance of the 22
centre of rotation to the volume middle of the head, the distance of the centre of rotation to 23
the volume middle of the snout and the total moment of inertia with respect to the centre of 24
rotation, respectively. 25 Variable N Slope S.E.M. R² Isometric slope P* Snout width 76 0.88 0.01 0.99 1 <0.0001 Snout height 76 0.90 0.01 0.99 1 <0.0001 Head length 76 0.89 0.01 0.99 1 <0.0001 Head width 76 0.66 0.01 0.99 1 <0.0001 Head height 76 0.92 0.01 0.99 1 <0.0001 R 62 0.89 0.01 0.99 1 <0.0001 r 62 0.67 0.01 0.99 1 <0.0001 I 76 4.53 0.02 0.99 1 <0.0001 * P-value is the result of a t-value which was obtained by subtracting the measured slope with the predicted 26 (isometric) slope, divided by S.E.M. of the measured slope. 27 28
24
Table 2: The results of the kinematical analysis of head rotation (mean ± S.E.M.) in the five 1
age classes <1 week, 1, 2, 3 weeks and adults, with N = 10, 13, 13, 14 and 12, respectively. 2 Head rotation <1 week 1 week 2 weeks 3 weeks Adult
Maximum rotation (deg) 44 ± 2 43 ± 3 37.7 ± 1.7 33.3 ± 1.3 25 ± 3
Time to maximum rotation (ms) 3.3 ± 0.3 3.11 ± 0.17 3.36 ± 0.18 3.78 ± 0.18 6.4 ± 0.9
Maximum angular velocity (x 103 deg s-1) 32.5 ± 1.5 33 ± 4 26.5 ± 1.2 21.9 ± 1.4 15.3 ± 1.2
Time to maximum angular velocity (ms) 1.35 ± 0.06 1.32 ± 0.08 1.30 ± 0.07 1.40 ± 0.05 2.57 ± 0.12
3
Table 3: Results of the log-transformed maximum head rotation, maximum angular velocity 4
and their time to peak regressed to log head length for the juvenile and adult data (N = 62) and 5
for the juvenile data without the adults (N = 50). 6 Data of juveniles and adults Data of juveniles without adults
Head rotation Slope S.E.M. R² P Slope S.E.M. R² P
Maximum rotation -0.21 0.03 0.38 <0.0001 -0.44 0.15 0.15 0.005
Time to maximum rotation 0.22 0.03 0.40 <0.0001 0.44 0.16 0.13 0.008
Maximum angular velocity -0.25 0.03 0.48 <0.0001 -0.73 0.20 0.21 0.0009
Time to maximum angular velocity 0.26 0.03 0.51 <0.0001 0.02 0.22 <0.0005 0.92
7
8
9
10
11
Table 4: The statistical comparison between the measured snout length l and the predicted, 12
optimal snout length lopt. 13 Age l (mm) lopt (mm) t df P <1 week 2.16 ± 0.01 2.51 ± 0.02 -16.22 19 <0.0001 1 week 2.30 ± 0.03 2.54 ± 0.03 -12.69 19 <0.0001 2 weeks 3.08 ± 0.07 3.35 ± 0.13 -4.12 10 <0.0001 3 weeks 3.23 ± 0.10 3.53 ± 0.08 -5.33 14 <0.0001 Adult 19.35 ± 0.44 19.22 ± 0.52 0.71 9 0.50 14
Table 5: The results of the minimal reach time Tmin of the measured and predicted snout 15
length, and upper and lower limits of lopt for a 5% increase in prey reach time in each age 16
class (mean ± S.E.M.). 17
Age Tmin for l (ms) Tmin for lopt (ms) lopt (mm) Upper limit of lopt for
tmin + 5% (mm)
Lower limit of lopt for
tmin + 5% (mm)
<1 week 2.77 ± 0.05 2.75 ± 0.03 2.51 ± 0.02 1.79 ± 0.02 3.64 ± 0.02
1 week 3.06 ± 0.02 3.04 ± 0.04 2.54 ± 0.03 1.74 ± 0.04 3.74 ± 0.04
2 weeks 3.15 ± 0.08 3.14 ± 0.11 3.35 ± 0.13 2.45 ± 0.08 4.57 ± 0.08
3 weeks 3.24 ± 0.09 3.23 ± 0.10 3.53 ± 0.08 2.85 ± 0.09 5.32 ± 0.09
Adult 5.89 ± 0.23 5.89 ± 0.25 19.22 ± 0.52 13.10 ± 0.41 27.62 ± 0.42
18
25
Figure legends 1
2
Fig. 1: In analogy with the model of de Lussanet and Muller, the snout and the head without 3
the snout are approximated by an elliptic cylinder and by a half-ellipsoid, respectively. The 4
filled circle resembles the position of the neck joint and the open circle approximates the 5
position of the centre of rotation. With H, L and W the height, length and width, respectively, 6
of the head and h, l and w the height, length and width, respectively, of the snout. The 7
parameters R and r indicate the distance of the centre of rotation and the middle of the head 8
and the snout, respectively. According to de Lussanet and Muller (2007), the difference 9
between model output with or without the snout continuing within the head base was 10
negligible. Therefore, this simplification was also used in this study. 11
12
Fig. 2: Schematic illustration of the position of the two digitised landmarks (1-2) used to 13
obtain head rotation from the video recordings. The same landmarks were used to determine 14
the position of the centre of head rotation (CR), for further explanation see text. The position 15
of the seahorse head at the beginning of the feeding strike is indicated by the black contour 16
lines and the two landmarks being 1 and 2. The position of the seahorse head near maximal 17
head rotation is indicated by the gray colour with the position of the respective landmarks at 18
that time represented by 1’ and 2’. 19
20
Fig. 3: Examples of the different position of the centre of head rotation (CR). The elliptical 21
cylinder represents the snout (see Fig. 1) and the white point indicates its volume middle. The 22
arrows indicate different lengths of b, which is the perpendicular distance between the volume 23
middle of the snout and the vertical line through CR. The four discrete positions of b are in 24
clockwise direction b, 0.75b, 0.5b and 0.25b. 25
26
Fig. 4: Illustrations of the position of the centre of head rotation (CR) for the age classes (from 27
left to right) <1 week, 1 week, 2 weeks, 3 weeks and adult. 28
29
Fig. 5: The time profiles of the average head rotation (A) and angular velocity (B) represented 30
with their standard error in each age class. The colour-coded vertical lines at the bottom of 31
each graph indicate the time at which the profile with the same colour reaches its maximum. 32
For details, see table 2. 33
34
26
Fig. 6: An overview of the total moment of inertia Itot of the head and the snout (left column), 1
the minimal reach time (middle column) and the required torque Q (right column) for four 2
different positions of the centre of rotation with increasing snout length for each age class. 3
The four different position of the centre of rotation are represented in Fig. 2. The simulation 4
in which the measured distance of the centre of rotation is used, is represented by the black 5
dashed line. 6
7
8
9
10
11
12
13
14
15
16
17
18
19
Figures 20
21
Fig. 1 22
23
24 25
26
27
Fig. 2 1
2
3 4
5
6
7
8
9
10
11
Fig. 3 12
13
14 15
Fig. 4 16
17
28
1
Fig. 5 2
3
4 5
6
7
8
9
10
11
Fig. 6 12
13
29
1 2